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42 votes
Find the derivative of the function

f(x)=(2x+1)ln(2x+7)
and then evaluate it at x=0 .

f′(0)=

User Dirk Holsopple
by
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1 Answer

12 votes
12 votes


f'(x)=2\ln(2x+7) + \left((2x+1)/(2x+7)\right)


f'(0) = 2ln(7) + (1)/(7)

Explanation:

Recall that the derivative of a product of two functions
f(x)=g(x)h(x) is defined as


(df(x))/(dx)=f'(x)= (dg(x))/(dx)h(x) + g(x)(dh(x))/(dx)

Let
g(x)=2x+1 and
h(x)=\ln(2x+7) so f'(x) is


f'(x)=2\ln(2x+7) + \left((2x+1)/(2x+7)\right)

Evaluated at x = 0, the value of the derivative is


f'(0) = 2ln(7) + (1)/(7)

User Craigo
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